Question

prove that the product of an odd function and even function is an odd function
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Answer 1

Prove the following: The sum of two odd functions is odd, and the sum of two even functions is even. The product of two even functions is even, the product of two odd functions is even, and the product of an odd function and an even function is odd. ... If f is odd and g is even, then the sum f+g is neither odd nor even.

Answer 2

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